Whitney embedding theorem Guide, Meaning , Facts, Information and Description
In differential topology, the Whitney embedding theorem states thatAny smooth second-countable -dimensional manifold can be embedded in Euclidean -space.The result is sharp, in particular the projective -space cannot be embedded into Euclidean ()-space
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Cases and can be done by hand. For
a general position argument show that there is an immersion with transversal self-intersections.
Then apply the Whitney trick, i.e. the following procedure which removes self-intersections one by one.
Suppose is a point of self-intersection and such that . Connect and by a smooth curve
By a general position argument it can be constructed with no self-intersections and with no intersections with (here we use that ). Then one can deform in a little neighborhood of so that the self-intersecton disappears. (The last statement is very easy to see once you visualize this picture properly)
Whitney trick is used to prove h-cobordism theorem, it also shows that two oriented submanifolds of complimentary dimensions in a simply connected manifold of dimension are isotopic to submanifolds such that all points of intesections have the same sign.
The occasion of the proof by Hassler Whitney of the embedding theorem for smooth manifolds is said (rather surprisingly) to have been the first complete exposition of the manifold concept (which had been implicit in Riemann's work, Lie group theory, and general relativity for many years); building on Hermann Weyl's book The Idea of a Riemann surface. This is an Article on Whitney embedding theorem. Page Contains Information, Facts Details or Explanation Guide About Whitney embedding theorem A little about the proof
Whitney trick
so that is a simple closed curve in . Construct an embedding of a -disc with boundary . Other things coming from Whitney trick
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